On the algebraic K-theory of coordinate axes and truncated polynomial algebras

Department of Mathematical Sciences

On the algebraic K-theory of coordinate axes and truncated polynomial algebras

Research output: Book/Report › Ph.D. thesis › Research

Standard

On the algebraic K-theory of coordinate axes and truncated polynomial algebras. / Speirs, Martin Patrick.

Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2018.

Research output: Book/Report › Ph.D. thesis › Research

Harvard

Speirs, MP 2018, On the algebraic K-theory of coordinate axes and truncated polynomial algebras. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen. <https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122118023605763>

APA

Speirs, M. P. (2018). On the algebraic K-theory of coordinate axes and truncated polynomial algebras. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen. https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122118023605763

Vancouver

Speirs MP. On the algebraic K-theory of coordinate axes and truncated polynomial algebras. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2018.

Author

Speirs, Martin Patrick. / On the algebraic K-theory of coordinate axes and truncated polynomial algebras. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2018.

Bibtex

@phdthesis{cf53a63eaf6c4cdaaac2fcf8e5d39438,

title = "On the algebraic K-theory of coordinate axes and truncated polynomial algebras",

abstract = "This thesis is concerned with computations of algebraic K-theory using the cyclotomic trace map. We use the framework for cyclotomic spectra due to Nikolaus and Scholze, which avoids the use of genuine equivariant homotopy theory. The thesis contains an introduction followed by two papers.The first paper computes the K-theory of the coordinate axes in affine d-space over perfect fields of positive characteristic. This extends work by Hesselholt in the case d = 2. The analogous results for fields of characteristic zero were found by Geller, Reid and Weibel in 1989. We also extend their computations to base rings which are smooth Q-algebras.In the second paper we revisit the computation, due to Hesselholt and Madsen, of the K-theory of truncated polynomial algebras for perfect fields of positive characteristic. The original proof relied on an understanding of cyclic polytopes in order to determine the genuine equivariant homotopy type of the cyclic bar construction for a suitable monoid. Using the Nikolaus-Scholze framework we achieve the same result using only the homology of said cyclic bar construction, as well as the action of Connes{\textquoteright} operator.",

author = "Speirs, {Martin Patrick}",

year = "2018",

language = "English",

publisher = "Department of Mathematical Sciences, Faculty of Science, University of Copenhagen",

}

RIS

TY - BOOK

T1 - On the algebraic K-theory of coordinate axes and truncated polynomial algebras

AU - Speirs, Martin Patrick

PY - 2018

Y1 - 2018

N2 - This thesis is concerned with computations of algebraic K-theory using the cyclotomic trace map. We use the framework for cyclotomic spectra due to Nikolaus and Scholze, which avoids the use of genuine equivariant homotopy theory. The thesis contains an introduction followed by two papers.The first paper computes the K-theory of the coordinate axes in affine d-space over perfect fields of positive characteristic. This extends work by Hesselholt in the case d = 2. The analogous results for fields of characteristic zero were found by Geller, Reid and Weibel in 1989. We also extend their computations to base rings which are smooth Q-algebras.In the second paper we revisit the computation, due to Hesselholt and Madsen, of the K-theory of truncated polynomial algebras for perfect fields of positive characteristic. The original proof relied on an understanding of cyclic polytopes in order to determine the genuine equivariant homotopy type of the cyclic bar construction for a suitable monoid. Using the Nikolaus-Scholze framework we achieve the same result using only the homology of said cyclic bar construction, as well as the action of Connes’ operator.

AB - This thesis is concerned with computations of algebraic K-theory using the cyclotomic trace map. We use the framework for cyclotomic spectra due to Nikolaus and Scholze, which avoids the use of genuine equivariant homotopy theory. The thesis contains an introduction followed by two papers.The first paper computes the K-theory of the coordinate axes in affine d-space over perfect fields of positive characteristic. This extends work by Hesselholt in the case d = 2. The analogous results for fields of characteristic zero were found by Geller, Reid and Weibel in 1989. We also extend their computations to base rings which are smooth Q-algebras.In the second paper we revisit the computation, due to Hesselholt and Madsen, of the K-theory of truncated polynomial algebras for perfect fields of positive characteristic. The original proof relied on an understanding of cyclic polytopes in order to determine the genuine equivariant homotopy type of the cyclic bar construction for a suitable monoid. Using the Nikolaus-Scholze framework we achieve the same result using only the homology of said cyclic bar construction, as well as the action of Connes’ operator.

UR - https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122118023605763

M3 - Ph.D. thesis

BT - On the algebraic K-theory of coordinate axes and truncated polynomial algebras

PB - Department of Mathematical Sciences, Faculty of Science, University of Copenhagen

ER -

ID: 210918073